Question

1. if m∠3 = 54°, find each measure.

a. m∠1=
b. m∠2=
c. m∠4=
d. m∠5=
e. m∠6=
f. m∠7=
g. m∠8=
h. m∠9=
i. m∠10=
j. m∠11=
k. m∠12=
l. m∠13=
m. m∠14=

Explanation:

Step1: Identify vertical - angle relationship

Vertical angles are equal. $\angle3$ and $\angle1$ are vertical angles. So $m\angle1=m\angle3 = 54^{\circ}$.

Step2: Identify complementary - angle relationship

$\angle2$ and $\angle3$ are complementary (since the angle formed by the intersection is a right - angle). So $m\angle2=90^{\circ}-m\angle3$. Substituting $m\angle3 = 54^{\circ}$, we get $m\angle2=90 - 54=36^{\circ}$.

Step3: Identify vertical - angle relationship for $\angle4$

$\angle4$ and $\angle2$ are vertical angles. So $m\angle4=m\angle2 = 36^{\circ}$.

Step4: Identify vertical - angle relationship for $\angle5$

$\angle5$ and $\angle3$ are vertical angles. So $m\angle5=m\angle3 = 54^{\circ}$.

Step5: Identify linear - pair relationship for $\angle6$

$\angle6$ and $\angle5$ form a linear pair. So $m\angle6 = 180^{\circ}-m\angle5$. Substituting $m\angle5 = 54^{\circ}$, we get $m\angle6=180 - 54 = 126^{\circ}$.

Step6: Identify vertical - angle relationship for $\angle7$

$\angle7$ and $\angle6$ are vertical angles. So $m\angle7=m\angle6 = 126^{\circ}$.

Step7: Identify vertical - angle relationship for $\angle8$

$\angle8$ and $\angle5$ are vertical angles. So $m\angle8=m\angle5 = 54^{\circ}$.

Step8: Identify vertical - angle relationship for $\angle9$

$\angle9$ and $\angle8$ are vertical angles. So $m\angle9=m\angle8 = 54^{\circ}$.

Step9: Identify vertical - angle relationship for $\angle10$

$\angle10$ and $\angle7$ are vertical angles. So $m\angle10=m\angle7 = 126^{\circ}$.

Step10: Identify vertical - angle relationship for $\angle11$

$\angle11$ and $\angle4$ are vertical angles. So $m\angle11=m\angle4 = 36^{\circ}$.

Step11: Identify vertical - angle relationship for $\angle12$

$\angle12$ and $\angle11$ are vertical angles. So $m\angle12=m\angle11 = 36^{\circ}$.

Step12: Identify vertical - angle relationship for $\angle13$

$\angle13$ and $\angle12$ are vertical angles. So $m\angle13=m\angle12 = 36^{\circ}$.

Step13: Identify vertical - angle relationship for $\angle14$

$\angle14$ and $\angle13$ are vertical angles. So $m\angle14=m\angle13 = 36^{\circ}$.

Answer:

a. $m\angle1 = 54^{\circ}$
b. $m\angle2 = 36^{\circ}$
c. $m\angle4 = 36^{\circ}$
d. $m\angle5 = 54^{\circ}$
e. $m\angle6 = 126^{\circ}$
f. $m\angle7 = 126^{\circ}$
g. $m\angle8 = 54^{\circ}$
h. $m\angle9 = 54^{\circ}$
i. $m\angle10 = 126^{\circ}$
j. $m\angle11 = 36^{\circ}$
k. $m\angle12 = 36^{\circ}$
l. $m\angle13 = 36^{\circ}$
m. $m\angle14 = 36^{\circ}$